1-contractive maps on noncommutative Lp-spaces

Abstract

Let T Lp( M) Lp( N) be a bounded operator between two noncommutative Lp-spaces, 1≤ p<∞. We say that T is 1-bounded (resp. 1-contractive) if T I1 extends to a bounded (resp. contractive) map from Lp( M;1) into Lp( N;1). We show that Yeadon's factorization theorem for Lp-isometries, 1≤ p=2 <∞, applies to an isometry T L2( M) L2( N) if and only if T is 1-contractive. We also show that a contractive operator T Lp( M) Lp( N) is automatically 1-contractive if it satisfies one of the following two conditions: either T is 2-positive; or T is separating, that is, for any disjoint a,b∈ Lp( M) (i.e. a*b=ab*=0), the images T(a),T(b) are disjoint as well.